We develop a method for studying fractal dimensions of forced almost periodic oscillations in various differential equations. The method is based on the previously introduced notion of the Diophantine dimension of an almost periodic function that is strictly connected with Diophantine approximations of its frequencies. Some estimates of the Diophantine dimension for typical quasi-periodic perturbations are obtained. For a class of control systems we state frequency-domain conditions under which the presented approach can be applied. As a result of our investigations one may observe a number-theoretic phenomenon (the Liouville phenomenon) arising within the mentioned problem. Its effect is in that we can not control fractal dimensions of qua...
International audienceWe consider particle motion in nonautonomous 1 degree of freedom Hamiltonian s...
We study fractal dimension properties of singular Jacobi operators. We prove quantitative lower spec...
[[abstract]]The studies of the phenomenon of chaos synchronization are usually based upon the analys...
In this paper we estimate fractal dimensions of almost periodic trajectories for a nonlinear evoluti...
AbstractIn this paper we estimate fractal dimensions of almost periodic trajectories for a semilinea...
AbstractIn this paper, we estimate fractal dimensions of quasi-periodic orbits. Recently, Naito cons...
24 pages, 8 eps-figuresWe introduce a deterministic model defined on a two dimensional hyperbolic la...
Both fractal geometry and dynamical systems have a long history of development and have provided fer...
Electromagnetics and Acoustics on a bounded domain are governed by the Helmholtz's equation; when su...
The dynamic and kinetic behavior of processes occurring in fractals with spatial discrete scale inv...
The phenomenon of resonance will be dealt with from the viewpoint of dynamical systems depending on ...
Albeverio S, Kondratiev Y, Nikiforov R, Torbin G. On new fractal phenomena connected with infinite l...
We consider quasiperiodic Jacobi and Schr\"odinger operators of both a single- and multi-frequency. ...
In recent years many deterministic parabolic equations have been shown to possess global attractors ...
Lyapunov exponents and fractal dimension of the twenty two chaotic oscillators avaluated by “Wolf’s ...
International audienceWe consider particle motion in nonautonomous 1 degree of freedom Hamiltonian s...
We study fractal dimension properties of singular Jacobi operators. We prove quantitative lower spec...
[[abstract]]The studies of the phenomenon of chaos synchronization are usually based upon the analys...
In this paper we estimate fractal dimensions of almost periodic trajectories for a nonlinear evoluti...
AbstractIn this paper we estimate fractal dimensions of almost periodic trajectories for a semilinea...
AbstractIn this paper, we estimate fractal dimensions of quasi-periodic orbits. Recently, Naito cons...
24 pages, 8 eps-figuresWe introduce a deterministic model defined on a two dimensional hyperbolic la...
Both fractal geometry and dynamical systems have a long history of development and have provided fer...
Electromagnetics and Acoustics on a bounded domain are governed by the Helmholtz's equation; when su...
The dynamic and kinetic behavior of processes occurring in fractals with spatial discrete scale inv...
The phenomenon of resonance will be dealt with from the viewpoint of dynamical systems depending on ...
Albeverio S, Kondratiev Y, Nikiforov R, Torbin G. On new fractal phenomena connected with infinite l...
We consider quasiperiodic Jacobi and Schr\"odinger operators of both a single- and multi-frequency. ...
In recent years many deterministic parabolic equations have been shown to possess global attractors ...
Lyapunov exponents and fractal dimension of the twenty two chaotic oscillators avaluated by “Wolf’s ...
International audienceWe consider particle motion in nonautonomous 1 degree of freedom Hamiltonian s...
We study fractal dimension properties of singular Jacobi operators. We prove quantitative lower spec...
[[abstract]]The studies of the phenomenon of chaos synchronization are usually based upon the analys...